Topology of Polymers: SpringerBriefs in the Mathematics of Materials, cartea 4
Autor Koya Shimokawa, Kai Ishihara, Yasuyuki Tezukaen Limba Engleză Paperback – 16 dec 2019
Plastics, films, and synthetic fibers are among typical examples of polymer materials fabricated industrially in massive quantities as the basis of modern social life. By comparison, polymers from biological resources, including proteins, DNAs, and cotton fibers, are essential in various processes in living systems. Such polymers are molecular substances, constituted by the linking of hundreds to tens of thousands of small chemical unit (monomer) components. Thus, the form of polymer molecules is frequently expressed by line geometries, and their linear and non-linear forms are believed to constitute the fundamental basis for their properties and functions. In the field of polymer chemistry and polymer materials science, the choice of macromolecules has continuously been extended from linear or randomly branched forms toward a variety of precisely controlled topologies by the introduction of intriguing synthetic techniques. Moreover, during the first decade of this century, a number of impressive breakthroughs have been achieved to produce an important class of polymers having a variety of cyclic and multicyclic topologies.
These developments now offer unique opportunities in polymer materials design to create unique properties and functions based on the form, i.e., topology, of polymer molecules. The introduction and application of topological geometry (soft geometry) to polymer molecules is a crucial requirement to account for the basic geometrical properties of polymer chains uniquely flexible in nature, in contrast to small chemical compounds conceived upon Euclidian geometry (hard geometry) principles. Topological geometry and graph theory are introduced for the systematic classification and notation of the non-linear constructions of polymer molecules, including not only branched but also single cyclic and multicyclic polymer topologies. On that basis, the geometrical–topological relationship between different polymers having distinctive constructions is discussed. A unique conception of topological isomerism is thus formed, which contrasts with that of conventional constitutional and stereoisomerism occurring in small chemical compounds.
Through the close collaboration of topology experts Shimokawa and Ishihara and the polymer chemist Tezuka, this monograph covers the fundamentals and selected current topics of topology applied in polymers and topological polymer chemistry. In particular, the aim is to provide novel insights jointly revealed through a unique interaction between mathematics (topology) and polymer materials science.
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Specificații
ISBN-13: 9784431568865
ISBN-10: 4431568867
Pagini: 81
Ilustrații: VIII, 81 p.
Dimensiuni: 155 x 235 mm
Greutate: 0.14 kg
Ediția:1st ed. 2019
Editura: Springer
Colecția Springer
Seria SpringerBriefs in the Mathematics of Materials
Locul publicării:Tokyo, Japan
ISBN-10: 4431568867
Pagini: 81
Ilustrații: VIII, 81 p.
Dimensiuni: 155 x 235 mm
Greutate: 0.14 kg
Ediția:1st ed. 2019
Editura: Springer
Colecția Springer
Seria SpringerBriefs in the Mathematics of Materials
Locul publicării:Tokyo, Japan
Cuprins
Topology meets polymers: Introduction.- Graph theory analyses of polymers.- Classification of polymer topologies based on alkane molecular graphs.- Types of graphs.- Knot theory analysis of polymers.- Topological operations and chemical isomerism of polymers.- Topological polymer chemistry and graph-structure construction.- Topology meets polymers: Conclusion and perspectives.
Recenzii
“It can also be read by anyone interested in a brief and compact review or reminder of the main notions or the basic results in those two fields. … this short and readable book is a laudable attempt to achieve an inter-disciplinary transfer of knowledge from mathematics to chemistry.” (Malte Henkel, zbMATH 1469.82002, 2021)
Caracteristici
Provides interactive insights from topological geometry and polymer (materials) science and technology Reveals heretofore unknown polymer properties and functions through the application of topology Presents new concepts and principles for polymer materials designs